# Multivariate polynomial regression with numpy

I have many samples `(y_i, (a_i, b_i, c_i))` where `y` is presumed to vary as a polynomial in `a,b,c` up to a certain degree. For example for a given set of data and degree 2 I might produce the model

`y = a^2 + 2ab - 3cb + c^2 +.5ac`

This can be done using least squares and is a slight extension of numpy's polyfit routine. Is there a standard implementation somewhere in the Python ecosystem?

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I've posted code here to solve this problem https://github.com/mrocklin/multipolyfit – MRocklin Jul 4 '12 at 23:55

polyfit does work, but there are better least square minimizers out there. I would recommend kmpfit, available at

http://www.astro.rug.nl/software/kapteyn-beta/kmpfittutorial.html

It is more robust that polyfit, and there is an example on their page which shows how to do a simple linear fit that should provide the basics of doing a 2nd order polynomial fit.

``````
def model(p, v, x, w):
a,b,c,d,e,f,g,h,i,j,k = p      #coefficients to the polynomials
return  a*v**2 + b*x**2 + c*w**2 + d*v*x + e*v*w + f*x*w + g*v + h*x + i*y + k

def residuals(p, data):        # Function needed by fit routine
v, x, w, z = data            # The values for v, x, w and the measured hypersurface z
a,b,c,d,e,f,g,h,i,j,k = p   #coefficients to the polynomials
return (z-model(p,v,x,w))   # Returns an array of residuals.
#This should (z-model(p,v,x,w))/err if
# there are error bars on the measured z values

#initial guess at parameters. Avoid using 0.0 as initial guess
par0 = [1.0, 1.0,1.0,1.0,1.0,1.0,1.0,1.0,1.0,1.0,1.0]

#create a fitting object. data should be in the form
#that the functions above are looking for, i.e. a Nx4
#list of lists/tuples like (v,x,w,z)
fitobj = kmpfit.Fitter(residuals=residuals, data=data)

# call the fitter
fitobj.fit(params0=par0)
``````
``` ```

The success of these things is closely dependent on the starting values for the fit, so chose carefully if possible. With so many free parameters it could be a challenge to get a solution.

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Can you post an example of multivariate regression using polyfit? I'm not convinced that this is supported. After looking through the documentation for kmpfit I fear this might be true of this library as well. – MRocklin Jun 11 '12 at 22:33
What are you trying to fit, y(x) = ax**2 + bx + c? Anyway, you can certainly do multivariable fitting with mpfit/kmpfit. – reptilicus Jun 12 '12 at 13:47
No, y(v, x, w) = av2 + bx2 + cw**2 + dvx + evw + fxw + gv + hx + iy + k – MRocklin Jun 12 '12 at 14:39
So this library would work but it solves the problem through an iterative method. Least squares polynomial fitting can be done in one step by solving a linear system. I've posted code in another answer that does this using numpy. – MRocklin Jul 6 '12 at 14:22

sklearn provides a simple way to do this.

Building off an example posted here:

``````#X is the independent variable (bivariate in this case)
X = array([[0.44, 0.68], [0.99, 0.23]])

#vector is the dependent data
vector = [109.85, 155.72]

#predict is an independent variable for which we'd like to predict the value
predict= [0.49, 0.18]

#generate a model of polynomial features
poly = PolynomialFeatures(degree=2)

#transform the x data for proper fitting (for single variable type it returns,[1,x,x**2])
X_ = poly.fit_transform(X)

#transform the prediction to fit the model type
predict_ = poly.fit_transform(predict)

#here we can remove polynomial orders we don't want
#for instance I'm removing the `x` component
X_ = delete(X_,(1),axis=1)
predict_ = delete(predict_,(1),axis=1)

#generate the regression object
clf = linear_model.LinearRegression()
#preform the actual regression
clf.fit(X_, vector)

print("X_ = ",X_)
print("predict_ = ",predict_)
print("Prediction = ",clf.predict(predict_))
``````

And heres the output:

``````>>> X_ =  [[ 0.44    0.68    0.1936  0.2992  0.4624]
>>>  [ 0.99    0.23    0.9801  0.2277  0.0529]]
>>> predict_ =  [[ 0.49    0.18    0.2401  0.0882  0.0324]]
>>> Prediction =  [ 126.84247142]
``````
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